Domain variations of the first eigenvalue via a strict Faber-Krahn type inequality

Abstract

For d≥ 2 and 2d+2d+2 < p < ∞ , we prove a strict Faber-Krahn type inequality for the first eigenvalue λ 1( ) of the p-Laplace operator on a bounded Lipschitz domain ⊂ Rd (with mixed boundary conditions) under the polarizations. We apply this inequality to the obstacle problems on the domains of the form O, where O⊂ ⊂ is an obstacle. Under some geometric assumptions on and O, we prove the strict monotonicity of λ 1 ( O) with respect to certain translations and rotations of O in .